| JOURNAL OF GEOMETRY AND PHYSICS | 卷:62 |
| Rigidity of complete noncompact bach-flat n-manifolds | |
| Article | |
| Chu, Yawei1,2 Feng, Pinghua3 | |
| [1] Zhengzhou Univ, Dept Math, Zhengzhou 450001, Peoples R China | |
| [2] Fuyang Teachers Coll, Sch Math & Computat Sci, Fuyang 236037, Peoples R China | |
| [3] Henan Inst Educ, Dept Math, Zhengzhou 450014, Peoples R China | |
| 关键词: Bach-flat; Rigidity; Trace-free curvature tensor; Constant curvature space; | |
| DOI : 10.1016/j.geomphys.2012.06.011 | |
| 来源: Elsevier | |
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【 摘 要 】
Let (M-n, g) be a complete noncompact Bach-flat n-manifold with the positive Yamabe constant and constant scalar curvature. Assume that the L-2-norm of the trace-free Riemannian curvature tensor (R) over circlem is finite. In this paper, we prove that (M-n, g) is a constant curvature space if the L-n/2-norm of (R) over circlem is sufficiently small. Moreover, we get a gap theorem for (M-n, g) with positive scalar curvature. This can be viewed as a generalization of our earlier resuits of 4-dimensional Bach-flat manifolds with constant scalar curvature R >= 0 [Y.W. Chu, A rigidity theorem for complete noncompact Bach-flat manifolds, J. Geom. Phys. 61 (2011) 516-521]. Furthermore, when n > 9, we derive a rigidity result for R < 0. (C) 2012 Elsevier B.V. All rights reserved.
【 授权许可】
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【 预 览 】
| Files | Size | Format | View |
|---|---|---|---|
| 10_1016_j_geomphys_2012_06_011.pdf | 215KB |  download |
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